On two weight estimates for dyadic operators

Abstract

We provide a quantitative two weight estimate for the dyadic paraproduct πb under certain conditions on a pair of weights (u;v) and b in Carlu,v, a new class of functions that we show coincides with BMO when u = v ∈ Ad2. We obtain quantitative two weight estimates for the dyadic square function and the martingale transforms under the assumption that the maximal function is bounded from L2(u) into L2(v) and v ∈ RHd1. Finally we obtain a quantitative two weight estimate from L2(u) into L2(v) for the dyadic square function under the assumption that the pair (u; v) is in joint Ad2 and u-1 ∈ RHd1, this is sharp in the sense that when u = v the conditions reduce to u ∈ Ad2 and the estimate is the known linear mixed estimate.